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A heavy stone of mass m is hung from the ceiling by a thin 8.25-g wire that is 65.0 cm long. When you gently pluck the upper end of the wire, a pulse travels down the wire and returns 7.84 ms later, having reflected off the lower end. The stone is heavy enough to prevent the lower end of the wire from moving. What is the mass m of the stone

Answer :

aliakbar921853

Answer: m= 35.6 kg

Explanation:

For finding the mass of the stone we have the formula

v= [tex]\sqrt{\frac{Tension}{Linear. Mass. density} }[/tex]

Here, Tension= m*g = m*9.81

and linear mass density= [tex]\frac{8.25 g}{65 cm}[/tex]

Linear mass density= [tex]\frac{8.25*10^-3}{65*10^-2}[/tex]

Linear mass density= 0.0127 kg/m

Velocity= [tex]2*\frac{l}{t}[/tex]

Velocity= 2 * [tex]\frac{65*10^-2}{7.84}[/tex]

Velocity= 165.8 m/s

So putting all these values in equation we get

v= [tex]\sqrt{\frac{Tension}{Linear. Mass. density} }[/tex]

165.8= [tex]\sqrt{\frac{m*9.81}{0.0127} }[/tex]

Solving we get

m= 35.58 kg

or m= 35.6 kg

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